Proof. Observe that

$$ \begin{align*} (1-x)(G_{\mathbb{N}\setminus A}(x))^{k}& = \sum_{n=0}^{\infty}R_{\mathbb{N}\setminus A,k}(n)x^{n}-\sum_{n=0}^{\infty}R_{\mathbb{N}\setminus A,k}(n)x^{n+1}\\ &=R_{\mathbb{N}\setminus A,k}(0)+\sum_{n=1}^{\infty}(R_{\mathbb{N}\setminus A,k}(n)-R_{\mathbb{N}\setminus A,k}(n-1))x^{n}. \end{align*} $$

However,

$$ \begin{align*} &(1-x)((G_{\mathbb{N}\setminus A)}(x))^{k} = (1-x)\bigg(\frac{1}{1-x}-G_{A}(x)\bigg)^{k} = (1-x)\sum_{i=0}^{k}\binom{k}{i}\frac{(-1)^{i}}{(1-x)^{k-i}}G_{A}(x)^{i}\\ &=\frac{1}{(1-x)^{k-1}} + \sum_{i=1}^{k-2}\binom{k}{i}\frac{(-1)^{i}}{(1-x)^{k-i-1}}G_{A}(x)^{i}+(-1)^{k-1}kG_{A}(x)^{k-1}+(-1)^{k}(1-x)G_{A}(x)^{k}. \end{align*} $$

It is well known that

$$ \begin{align*} \frac{1}{(1-x)^{m}} = \sum_{n=0}^{\infty}\binom{n+m-1}{m-1}x^{n}. \end{align*} $$

It follows that

$$ \begin{align*} &R_{\mathbb{N}\setminus A,k}(0)+\sum_{n=1}^{\infty}(R_{\mathbb{N}\setminus A,k}(n)-R_{\mathbb{N}\setminus A,k}(n-1))x^{n}\\ &\quad=\sum_{n=0}^{\infty}\binom{n+k-2}{k-2}x^{n} + \sum_{i=1}^{k-2}(-1)^{i}\binom{k}{i}\sum_{n=0}^{\infty}\Bigg(\sum_{m=0}^{n}\binom{m+k-i-2}{k-i-2}R_{A,i}(n-m)\Bigg)x^{n}\\ &\qquad +(-1)^{k-1}k\sum_{n=0}^{\infty}R_{A,k-1}(n)x^{n}+(-1)^{k}R_{A,k}(0)+(-1)^{k}\sum_{n=0}^{\infty}(R_{A,k}(n)-R_{A,k}(n-1))x^{n}. \end{align*} $$

By comparing the coefficient of $x^{n}$ on both sides of this equation, Lemma 2.1 follows immediately.

Proof of Theorem 1.1.

Clearly,

$$ \begin{align*} R_{A,i}(n) & =|\{ (a_{1}, a_2,\dots{}, a_{i})\in A^i: a_{1} + a_2+\cdots{} + a_{i} = n \}|\\ &\le |\{ (a_{1},a_2, \dots{},a_{i-1})\in A^{i-1}: a_{1},a_2, \dots{} ,a_{i-1} \le n \}| = A(n)^{i-1}. \end{align*} $$

By Lemma 2.1, there exist constants $c_{1},c_{2},c_{3}, c_{4}$ only depending on k such that

$$ \begin{align*} &R_{\mathbb{N}\setminus A,k}(n)-R_{\mathbb{N}\setminus A,k}(n-1)\\ &\quad= \binom{n+k-2}{k-2}+\sum_{i=1}^{k-2}\binom{k}{i}(-1)^{i}\Bigg(\sum_{m=0}^{n}\binom{m+k-i-2}{k-i-2}R_{A,i}(n-m)\Bigg)\\ &\qquad +(-1)^{k-1}kR_{A,k-1}(n)+(-1)^{k}(R_{A,k}(n)-R_{A,k}(n-1))\\ &\quad\ge \frac{n^{k-2}}{(k-2)!}-\sum_{i=1}^{k-2}2^{k}\sum_{m=0}^{n}\binom{m+k-i-2}{k-i-2}A(n)^{i-1}-kR_{A,k-1}(n)-A(n)^{k-1}\\ &\quad\ge \frac{n^{k-2}}{(k-2)!}-\sum_{i=1}^{k-2}2^{k}A(n)^{i-1}\binom{n+k-i-1}{k-i-2}\\ &\qquad -k\bigg(\frac{n^{{(k-2)}/{(k-1)}}}{\sqrt[k-1]{(k-2)!}}\bigg)^{k-2} -\bigg(\frac{n^{{(k-2)}/{(k-1)}}}{\sqrt[k-1]{(k-2)!}}-2\bigg)^{k-1}\\ &\quad\ge \frac{n^{k-2}}{(k-2)!}-c_{1}\sum_{i=1}^{k-2}A(n)^{i-1}n^{k-i-2}-k\cdot\frac{n^{{(k-2)^{2}}/{(k-1)}}}{((k-2)!)^{{(k-2)}/{(k-1)}}}\\ &\qquad -\bigg(\frac{n^{k-2}}{(k-2)!}-2(k-1)\frac{n^{{(k-2)^2}/{(k-1)}}} {((k-2)!)^{{(k-2)}/{(k-1)}}}+c_{2}n^{{(k-2)(k-3)}/{(k-1)}}\bigg)\\ &\quad\ge \frac{n^{k-2}}{(k-2)!}-c_{3}n^{k-3}-k\frac{n^{{(k-2)^{2}}/{(k-1)}}}{((k-2)!)^{{(k-2)}/{(k-1)}}} \\ &\qquad -\bigg(\frac{n^{k-2}}{(k-2)!}-\frac{2(k-1)n^{{(k-2)^{2}}/{(k-1)}}}{((k-2)!)^{{(k-2)}/{(k-1)}}} +c_{2}n^{{(k-2)(k-3)}/{(k-1)}}\bigg)\\ &\quad= \frac{k-2}{((k-2)!)^{{(k-2)}/{(k-1)}}}\cdot n^{{(k-2)^{2}}/{(k-1)}}-c_{4}n^{k-3}. \end{align*} $$

Hence, $R_{\mathbb {N}\setminus A,k}(n)-R_{\mathbb {N}\setminus A,k}(n-1)>0$ when n is large enough.

Proof of Lemma 2.2.

Fix a natural number n. Let $A \cap [1, n]=\{a_1<a_2<\cdots <a_m\}$ and $\overline {A}=\{n-a_m<n-a_{m-1}<\cdots <n-a_1\}$ . For $i=1,2,\ldots ,m$ , we define

$$ \begin{align*}A_i=\{a_i+a_1<a_i+a_2<\cdots<a_i+a_{m+1-i}<a_{i+1}+a_{m+1-i}<\cdots<a_m+a_{m+1-i}\}.\end{align*} $$

Clearly,

$$ \begin{align*} R_{A, 3}(n)=\sum_{i=1}^m|A_i\cap \overline{A}| & \leqslant \sum_{i=1}^m \min \{2 m-2 i+1, m\}\\ &=\sum_{i=1}^{\lfloor{m}/{2}\rfloor} m+\sum_{i=\lfloor{m}/{2}\rfloor+1}^m(2 m-2 i+1)\\ &=m\bigg\lfloor\frac{m}{2}\bigg\rfloor+\bigg(m-\bigg\lfloor\frac{m}{2}\bigg\rfloor\bigg)^2=\frac{3}{4} m^2+\bigg\{\frac{m^2}{4}\bigg\}. \\[-3.4pc] \end{align*} $$

Proof of Theorem 1.3.

Applying Lemma 2.1 for $k = 3$ ,

$$ \begin{align*} &R_{\mathbb{N} \backslash A,3}(n) -R_{\mathbb{N} \backslash A,3}(n-1) \\ &\quad = n + 1 -3\sum_{m=0}^{n}R_{A,1}(n-m)+3R_{A,2}(n)-(R_{A,3}(n)-R_{A,3}(n-1)) \\ &\quad = n + 1 - 3A(n) + 3R_{A,2}(n) - (R_{A, 3}(n) - R_{A, 3}(n-1)). \end{align*} $$

Hence, by Lemma 2.2,

$$ \begin{align*} &R_{\mathbb{N} \backslash A,3}(n) -R_{\mathbb{N} \backslash A,3}(n-1)\ge n + 1 - 3A(n) - R_{A,3}(n) \\ &\quad \ge n+1-3\bigg(\frac{2}{\sqrt{3}}\sqrt{n}-2\bigg) -\frac{3}{4}\bigg(\frac{2}{\sqrt{3}}\sqrt{n}-2\bigg)^{2}-\frac{1}{4}=\frac{15}{4}> 0, \end{align*} $$

which completes the proof.

Proof of Theorem 1.4.

We may suppose that $f(n)<\!\!\sqrt [k-1]{k-1}\cdot n^{{(k-2)}/{(k-1)}}$ . We define an infinite sequence of natural numbers $N_{1}, N_{2}, \dots {}$ by induction. Let $N_{1} = 100k^4$ . Assume that $N_{1}, \dots {} ,N_{j}$ are already defined. Let $N_{j+1}$ be an even number with $N_{j+1}> 100k^4N_{j}^{k-1}$ and $f(n)> (k-1)(N_{1}^{k-2} + \cdots {} + N_{j}^{k-2})$ for every $n \ge N_{j+1}$ . We define the set A by

$$ \begin{align*} A = \bigcup_{j=1}^{\infty}\{N_{j}, 2N_{j}, 3N_{j}, \dots{} ,(k-1)N_{j}^{k-1}\}. \end{align*} $$

First, we give an upper estimation for $A(n)$ . Let $n\ge 100k^4$ . Then there exists an index j such that $N_{j} \le n < N_{j+1}$ . Define l as the largest integer with $l \le (k-1)N_{j}^{k-2}$ and $lN_{j} \le n$ . Then,

$$ \begin{align*} &A(n) -\!\!\sqrt[k-1]{k-1}n^{{(k-2)}/{(k-1)}} \\ &\quad\le (k-1)(N_{1}^{k-2} + \cdots{} + N_{j}^{k-2}) + l - \!\!\sqrt[k-1]{k-1}(lN_{j})^{{(k-2)}/{(k-1)}}\\ &\quad=(k-1)(N_{1}^{k-2} + \cdots{} + N_{j}^{k-2}) + l^{{(k-2)}/{(k-1)}}(l^{{1}/{(k-1)}}-(k-1)^{{1}/{(k-1)}}N_{j}^{{(k-2)}/{(k-1)}})\\ &\quad \le f(n), \end{align*} $$

which implies that

$$ \begin{align*}A(n)<\!\!\sqrt[k-1]{k-1}\cdot n^{{(k-2)}/{(k-1)}}+f(n). \end{align*} $$

Next, we shall prove that there exist infinitely many positive integers n such that $R_{\mathbb {N}\setminus A,k}(n)<R_{\mathbb {N}\setminus A,k}(n-1)$ . To prove this, we divide into two cases according to the parity of k.

Suppose that k is an odd integer. For $j=1,2,\ldots ,$ we define

$$ \begin{align*}u_j=(k-1)N_{j}^{k-1} + 100(k-2)(k-1)^3N_{j}^{k-2}. \end{align*} $$

Now, we show that $R_{\mathbb {N}\setminus A,k}(u_j) < R_{\mathbb {N}\setminus A,k}(u_j-1)$ when j is large enough.

Since all the elements of A are even and $u_j-1$ is odd, it follows that $R_{A,k}(u_j-1)=0$ . By Lemma 2.1,

(2.1) $$ \begin{align} &\nonumber R_{\mathbb{N}\setminus A,k}(u_j) - R_{\mathbb{N}\setminus A,k}(u_j-1)\\ &\quad=\nonumber \binom{u_j+k-2}{k-2}+\sum_{i=1}^{k-2}\binom{k}{i}(-1)^{i}\Bigg(\sum_{m=0}^{u_j}\binom{m+k-i-2}{k-i-2}R_{A,i}(u_j-m)\Bigg)\\ &\qquad \nonumber + (-1)^{k-1}kR_{A,k-1}(u_j)+ (-1)^{k}(R_{A,k}(u_j)-R_{A,k}(u_j-1))\\ &\quad\le \nonumber\binom{u_j+k-2}{k-2}+k^2\Bigg(\sum_{m=0}^{u_j}\binom{m+k-4}{k-4}R_{A,2}(u_j-m)\Bigg)\\ &\qquad +\sum_{i=3}^{k-2}2^{k}\sum_{m=0}^{u_j}\binom{m+k-i-2}{k-i-2}A(u_j)^{i-1}+ kR_{A,k-1}(u_j)-R_{A,k}(u_j). \end{align} $$

Next we shall give a bound for each term of the right-hand side of (2.1). There exists a constant $c_5$ only depending on k such that

(2.2) $$ \begin{align} \binom{u_j+k-2}{k-2} \le \frac{(k-1)^{k-2}N_{j}^{k^{2}-3k+2}+100(k-2)^2(k-1)^{k}N_{j}^{k^{2}-3k+1}+c_{5}N_{j}^{k^{2}-3k}}{(k-2)!} \end{align} $$

and

(2.3) $$ \begin{align} & k^2\sum_{m=0}^{u_j}\binom{m+k-4}{k-4}R_{A,2}(u_j-m)\le k^2\sum_{m=0}^{u_j}\binom{m+k-4}{k-4}A(u_j-m) \nonumber\\ &\quad\le \nonumber k^2\sum_{m=0}^{u_j}\binom{m+k-4}{k-4}A(kN_{j}^{k-1})\le k^2\sum_{m=0}^{u_j}\binom{m+k-4}{k-4}2\sqrt[k-1]{k-1}(kN_j^{k-1})^{{(k-2)}/{(k-1)}} \\ &\quad\le \nonumber k^2\sum_{m=0}^{u_j}\binom{m+k-4}{k-4}2k N_j^{k-2}=2k^3N_j^{k-2}\binom{u_j+k-3}{k-3}\\ &\quad\le 2k^3N_j^{k-2}\binom{kN_j^{k-1}}{k-3}\le \frac{2k^k}{(k-3)!}N_j^{k^2-3k+1}. \end{align} $$

Furthermore,

(2.4) $$ \begin{align} &\nonumber\sum_{i=3}^{k-2}2^{k}\sum_{m=0}^{u_j}\binom{m+k-i-2}{k-i-2}A(u_j)^{i-1}\\ &\quad\le \nonumber c_{6}\sum_{i=3}^{k-2}2^{k}\sum_{m=0}^{u_j}\binom{m+k-i-2}{k-i-2}((N_{j}^{k-1})^{{(k-2)}/{(k-1)}})^{i-1}\\ &\quad\le\nonumber c_{6}\sum_{i=3}^{k-2}2^{k}N_{j}^{(k-2)(i-1)}\sum_{m=0}^{u_j}\binom{m+k-i-2}{k-i-2}\\ &\quad= \nonumber c_{6}\sum_{i=3}^{k-2}2^{k}N_{j}^{(k-2)(i-1)}\binom{u_j+k-i-1}{k-i-1}\\ &\quad\le c_{7}\sum_{i=3}^{k-2}N_{j}^{(k-2)(i-1)}\cdot N_{j}^{(k-1)(k-i-1)} =c_{7}\sum_{i=3}^{k-2}N_{j}^{k^{2}-3k-i+3} \le c_{8}N_{i}^{k^{2}-3k}, \end{align} $$

where $c_{6}, c_{7}$ and $c_{8}$ are constants only depending on k. Moreover,

(2.5) $$ \begin{align} R_{A,k-1}(u_j))&\le \nonumber A(u_j)^{k-2} \le A(kN_{j}^{k-1})^{k-2}\\ & \le (2\sqrt[k-1]{k-1}(kN_{j}^{k-1})^{{(k-2)}/{(k-1)}})^{k-2} \le (2k)^{k-2}N_{j}^{(k-2)^{2}}. \end{align} $$

Obviously,

$$ \begin{align*} &R_{A,k}(u_j) \\ &\quad\ge \bigg|\bigg\{(x_{1}, \dots{} ,x_{k})\in (\mathbb{Z}^+)^k: \sum_{t=1}^k x_t=u_j, N_{j}\mid x_{t}, x_{t} \le (k-1)N_{j}^{k-1}~\text{for}~t=1,\ldots,k\bigg\}\bigg|\\ &\quad=\bigg|\bigg\{(y_{1}, \dots{} ,y_{k})\in (\mathbb{Z}^+)^k: \sum_{t=1}^k y_t = \frac{u_j}{N_j}, y_{t} \le (k-1)N_{j}^{k-2}~\text{for}~t=1,\ldots,k\bigg\}\bigg|\\ &\quad=\bigg|\bigg\{(y_{1}, \dots{} ,y_{k})\in (\mathbb{Z}^+)^k: \sum_{t=1}^k y_t = \frac{u_j}{N_j}\bigg\} \bigg|\\ &\qquad - \bigg|\bigg\{(y_{1}, \dots{} ,y_{k})\in (\mathbb{Z}^+)^k: \sum_{t=1}^k y_t = \frac{u_j}{N_j},~y_{t}> (k-1)N_{j}^{k-2}~\text{for some}~t\in \{1,\ldots,k\}\bigg\}\bigg|. \end{align*} $$

We see that

$$ \begin{align*} &\bigg|\bigg\{(y_{1}, \dots{} ,y_{k})\in (\mathbb{Z}^+)^k: y_{1} + \cdots{} + y_{k} = \frac{u_j}{N_j}\bigg\}\bigg|\\ &\quad= \binom{{u_j}/{N_j}-1}{k-1} \ge \frac{N_{j}^{k^{2}-3k+2}+100(k-2)(k-1)^{k+2}N_{j}^{k^{2}-3k+1}+c_{9}N_{j}^{k^{2}-3k}}{(k-1)!}, \end{align*} $$

where $c_{9}$ is a constant only depending on k, and

$$ \begin{align*} &\bigg|\bigg\{(y_{1}, \dots{} ,y_{k})\in (\mathbb{Z}^+)^k: \sum_{t=1}^k y_t = \frac{u_j}{N_j},~y_{t}> (k-1)N_{j}^{k-2}~\text{for some}~t\in \{1,\ldots,k\}\bigg\}\bigg|\\ &\quad= k|\{(z_{1}, \dots{} ,z_{k})\in (\mathbb{Z}^+)^k: z_{1} + \cdots{} + z_{k} = 100(k-2)(k-1)^3N_{j}^{k-3}\}|\\ &\quad\le k(100(k-2)(k-1)^3)^kN_{j}^{k^{2}-3k}. \end{align*} $$

The last equality holds because if $y_{1} + \cdots {} + y_{k} = {u_j}/{N_j}$ with $y_{t}> (k-1)N_{j}^{k-1}$ , then

$$ \begin{align*}y_{1} + \cdots{} + y_{t-1} + (y_{t}-(k-1)N_{j}^{k-2}) + y_{t+1} + \cdots{} + y_{k} = 100(k-2)(k-1)^3N_{j}^{k-3},\end{align*} $$

where every term is positive. Furthermore, if $z_{1} + \cdots {} + z_{k} = 100(k-2)(k-1)^3N_{j}^{k-3}$ , $z_{i}\in \mathbb {Z}^{+}$ , then one can create k different sums of the form $ y_{1} + \cdots {} + y_{k} = {u_j}/{N_j}$ with $y_{i} = z_{i}$ if $i\neq t$ and $y_{t} = z_{t} + (k-1)N_{j}^{k-2}$ . Therefore,

(2.6) $$ \begin{align} R_{A,k}(u_j) \ge \frac{(k-1)^{k-1}N_{j}^{k^{2}-3k+2}+100(k-2)(k-1)^{k+2}N_{j}^{k^{2}-3k+1}+c_{10}N_{j}^{k^{2}-3k}}{(k-1)!}, \end{align} $$

where $c_{10}$ is a constant. In view of (2.1)–(2.6),

$$ \begin{align*} &R_{\mathbb{N}\setminus A,k}(u_j) - R_{\mathbb{N}\setminus A,k}(u_j-1)\\ & \quad\le \frac{(k-1)^{k-2}N_{j}^{k^{2}-3k+2}+100(k-2)^2(k-1)^k N_{j}^{k^{2}-3k+1}+c_{5}N_{j}^{k^{2}-3k}}{(k-2)!}\\ &\qquad +\frac{2k^k}{(k-3)!}N_j^{k^2-3k+1} + c_{8}N_{i}^{k^{2}-3k} + (2k)^{k-2}N_{j}^{(k-2)^{2}}\\ &\qquad -\frac{(k-1)^{k-1}N_{j}^{k^{2}-3k+2}+100(k-2)(k-1)^{k+2}N_{j}^{k^{2}-3k+1}+c_{10}N_{j}^{k^{2}-3k}}{(k-1)!}\\ &\quad=\bigg( \frac{2k^k}{(k-3)!} -100\frac{(k-1)^{k}}{(k-3)!} \bigg)N_{j}^{k^{2}-3k+1} + (2k)^{k-2}N_{j}^{(k-2)^{2}} + c_{11}N_{j}^{k^{2}-3k}, \end{align*} $$

where $c_{11}$ is a constant. Thus, we have $R_{\mathbb {N}\setminus A,k}(u_j) < R_{\mathbb {N}\setminus A,k}(u_j-1)$ when j is large enough.

If k is even, then the same argument shows that $R_{\mathbb {N}\setminus A,k}(u_j+1) < R_{\mathbb {N}\setminus A,k}(u_j)$ when j is large enough.